Department of Aerospace Engineering, Mechanics University of Cincinnati, Woodside Drive, Cincinnati, USA
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Solutions to Global Optimization Problems
Author(s): Shaaban A. Abdallah*
When there are no other practical solutions with superior objective function values, the solution is said to be globally optimal. When there are
no other viable alternatives "close by" with superior objective function values, the solution is said to be locally optimal. The goal function and/or
constraints may generate this point at the top of a "peak" or at the bottom of a "valley," but there may be a higher peak or a deeper valley far away
from the current point... Read More»
DOI:
10.37421/2229-8711.2022.13.304
Global Journal of Technology and Optimization received 847 citations as per Google Scholar report